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Alexandria Engineering Journal (2014) 53, 319–328
Alexandria University
Alexandria Engineering Journal
www.elsevier.com/locate/aejwww.sciencedirect.com
ORIGINAL ARTICLE
Effect of tension lap splice on the behaviorof high strength self-compacted concrete beams
* Corresponding author. Address: Structure Eng. Department, Fac-
ulty of Engineering, Cairo University, 48 Gezeeret El Arab, El
Mohandeseen, Giza, Egypt. Tel.: +20 2 02 33043850, mobile: +20 122
318 5801; fax: +20 2 02 33024645.
E-mail addresses: [email protected] (M.A. El-Azab),
[email protected] (H.M. Mohamed), [email protected]
(A. Farahat).1 Tel.: +20 01003017368.2 Tel.: +20 01223226904.
Peer review under responsibility of Faculty of Engineering, Alexandria
University.
Production and hosting by Elsevier
1110-0168 ª 2014 Production and hosting by Elsevier B.V. on behalf of Faculty of Engineering, Alexandria University.http://dx.doi.org/10.1016/j.aej.2014.01.009
Mahmoud A. El-Azab 1, Hatem M. Mohamed *, Ahmed Farahat 2
Faculty of Engineering, Cairo University, Cairo, Egypt
Received 7 December 2013; revised 24 January 2014; accepted 29 January 2014
Available online 6 March 2014
KEYWORDS
Bond;
Lap splice;
Concrete;
High strength;
Self-compacted;
Casting position
Abstract Construction using concrete is spreading widely and there is a need for concrete that is
capable of flowing under its own weight without mechanical vibration or compaction and fill the
places between reinforcement and the complicated form shapes. From here, Self-Compacted Con-
crete (SCC) appears for the first time. Limited attention has been directed toward the bond between
High Strength Self-Compacted Concrete (HSSCC) and spliced bars in beams [1–8].
This research studies the bond between HSSCC and spliced tension bars in beams. It is focused
on observing the effect of some factors such as; reinforcement bar diameter and ratio, splice length
and casting position on the beam flexural behavior. An experimental program consisting of sixteen
simply supported beams divided into four groups is considered. All beams are of 1800 mm span and
200 · 400 mm cross-section cast with HSSCC. In twelve beams, the tensile steel was spliced in theconstant moment zone, and four control beams without splice for comparison purpose. During test-
ing; ultimate capacity, deflection, crack pattern and mode of failure have been recorded. Test results
had been compared with proposed values in the Egyptian code of practice, other international
design codes and recorded values of other researchers.ª 2014 Production and hosting by Elsevier B.V. on behalf of Faculty of Engineering, Alexandria
University.
1. Introduction
Adequate bond between concrete and reinforcing bars in asplice is an essential requirement in the design of reinforcedconcrete structures. In the last 25 years, The Interest in
HSSCC grows rapidly and now it is widely used in bridgesand high rise building construction. This concrete was de-scribed as high-strength concrete (HSC) since it has higherstrength than the usual normal-strength concrete (NSC)
that has been produced for almost a century with 28-daysstrength in the range of 20–40 MPa. A typical applicationexample of Self-compacting concrete is the two anchorages
of Akashi-Kaikyo Bridge opened in April 1998 and the
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320 M.A. El-Azab et al.
suspension bridge with the longest span in the world(1991 m).
Many researches were reported on bond strength between
concrete and deformed bars for both normal strength and highstrength concrete. Experimental tests were done and analyticalequations were proposed by some researchers.
Various investigations have been carried out in order tomakeself-compacting concrete a standard one [9]. The items to besolved are summarized as, self-compactability testing method,
mix-design method including, acceptance testing method atjob site, and new type of powder or admixture suitable for self-compacting concrete. The European Guidelines for Self-Com-pacting Concrete [3] represents a state of the art document ad-
dressed to those specifiers, designers, purchasers, producersand users who wish to enhance their expertise and use of SCC.TheGuidelines have been prepared using thewide range of expe-
rience and knowledge available to the European Project Group.During the last ten years, few researches were conducted on
bond strength of self-compacting concrete [1–7]. In 1990, Ato-
rod Azizinamini et al. [1] tested a total of 18 beam specimenswith two or three bars spliced. The main variables were (a)Concrete compressive strength f0c, (b) Splice length; and (c)
Casting position. The results showed that normalized bondstrength decreases as concrete compressive strength increaseswith a rate of decrease increases as the splice length increases.In the case of normal strength concrete, the top bar demon-
strated approximately 8% reduction in bond capacity com-pared to bottom cast bars. As indicated by comparison withthe results, top bars, as defined by the ACI 318-11 [10], pro-
duce higher bond capacity when HSC is utilized.Yerlici and Özturan [2] conducted a research program for
testing 53 eccentric pullout test specimens. Tested specimens
were divided into four groups, where only a single parametervaried in each group. For the first three groups, the variableparameters were the concrete compressive strength, the rein-
forcing bar diameter, and the thickness of clear concrete cover.These parameters varied as 60, 70, 80, and 90 MPa (8700,10,150, 11,600, and 13,050 psi), 12, 16, 20, and 26 mm (No.4, 5, 6, and 8), and 15, 20, 25, and 30 mm (5/8, 3/8, 1, and
1-1/8 in.), respectively. The variable parameter of the fourthtest group was the amount of web reinforcement that wasmade up of three closed stirrups spaced at 30 mm (1-3/
16 in.), center-to-center, transversely crossing the anchoragelength of the longitudinal bars. The amount of web reinforce-ment varied from none to having stirrups made of 3, 4, and
6 mm (D-1, D-2, and D-4) diameter steel wires. It was indi-cated that the average anchorage bond strength varies withthe compressive strength of concrete, as ðf0cÞ
2=3. The ACI Code
slightly underestimates the effect of concrete strength on
anchorage bond resistance when extended to HSC, while itoverestimates the effect of concrete cover on anchorage bondresistance when extended to HSC.
The research project of Chan et al. [4] included the testingof a full-scale RC wall as the pullout specimen in which pulloutreinforcing bars and transverse reinforcement were installed,
some walls were SCC while others were cast from ordinarycompacted concrete. The main variables were; (a) Concretecompressive strength f0c, (b) Height of pull out bar (effect of
top bar), and (c) Age of Concrete from 17 h to 28 days. Itwas concluded that compared to normal concrete NC, SCCexhibits higher bond to reinforcing bars and lower reductionin bond strength due to the top-bar effect. The slow develop-
ment of compressive strength and bond strength in SCC atearly age is generally due to the retarding effect of the carbox-ylic high-range water-reducing admixture used.
Almeida et al. [5] tested 66 special set up beam specimensmade from 3 SCC mixes. The main variables were (a) Maxi-mum aggregate size, and (b) SCC fluidity. It was found that
the bond resistance was not affected by the SCC lack of fluid-ity. It was also found that high performance concretes have afragile rupture of the bond connection. Also, unless some con-
finement reinforcement is provided, the splitting of the con-crete surrounding the bar will occur as the concrete tensionstrength is reached. Finally, the desirable failure mode, withyielding or slip of the bar, will not occur. The behavior of
the beams was similar in the 3 series of tests, even consideringthe low fluidity of one of the 3 mixes.
Twelve full-scale beam specimens (2000 · 300 · 200 mm)were tested in positive bending [6] with the loading system de-signed to determine the effect of self-compacting concrete(SCC) and the diameter of reinforcement on bond–slip charac-
teristics of tension lap-slices. The specimens of lap-splice serieswere tested with lap-spliced bars centered on the midspan in aregion of constant positive bending. The results showed that
load transfer within the tension lap-spliced bars embedded inSCC in a reinforced concrete beam was better than that ofthe tension lap-spliced bars embedded in NC. The beam spec-imens produced from SCC had generally longer cracks in
length than the beams produced from NC regardless of thereinforcing bar diameter.
The project of Cattaneo and Rosati [7] included the testing
of 27 pullout specimens containing one embedded reinforce-ment bar. The main variables were reinforcement bar diame-ter, fiber existence and confinement. Two types of tests were
considered: unconfined and confined pullout. The tests showeda significant size effect on bond strength: the smaller bar diam-eter exhibited a higher strength than the larger one. The bond
strength of self-consolidating concrete was found to be higherthan normal strength concrete. The concrete cover, 4.5B,where B is the bar diameter, was not sufficient to prevent split-ting failure in SCC.
2. Experimental work
This research is a part of an experimental investigation [8]
which studies bond between high-strength self-compactingconcrete (HSSCC) and reinforcing bars in splices in beams.A total of sixteen concrete beams were fabricated and tested
in this experimental program. The specimens were divided intofour groups each has four specimens. The objectives of thisprogram are to examine the effect of some factors such as;
reinforcement bar size, reinforcement ratio, tension lap splicelength and casting position on the beam flexural behavior.
A three-part notation system was used to indicate the vari-ables of each beam. The first part of the notation indicates the
casting position: B and T for bottom and top casting respec-tively. The second part indicates the splice length as a factorof the bar diameter with two different bar diameters:
LM · N for splice length of M times bar diameter and N isthe diameter of reinforcement bar. The third part is the rein-forcement ratio: R.295 and R.424 for AS/(b · d) equal to0.295% and 0.424% respectively. The specimens with no spliceare referred to as the control specimens. The objectives of this
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Effect of tension lap splice of high strength self-compacted concrete beams 321
experimental program are to determine (I) Beam Capacity; (II)crack pattern and crack propagation; and (III) mode of failureof beams casted using high strength self-compacting concrete
(HSSCC) with lap-splices in tension zone.
2.1. Test specimens
Tests were carried out on sixteen high strength self-compactingconcrete beams reinforced with high grade steel bars spliced –if any – in the constant moment region and designed to start
failure in tension zone (under reinforced sections). Test beamswere simply supported with 2000 mm span (1800 mm Centerline to Center Line of supports) and 200 mm · 400 mmcross-section and they were tested in four point bend configu-ration. The specimens were divided into four groups; eachgroup consisted of four specimens. The details of the testedspecimens are shown in Table 1.
Group (I): This group consists of four specimens having thesame reinforcing ratio 0.295% and casting position (Bottom)but different in the splice length (0, 20, 30, and 40) times bar
diameter 10 mm. Group (II) consists of four specimens havingthe same reinforcing ratio 0.295% and casting position (Top)but different in the splice length (0, 20, 30, and 40) times bar
diameter 10 mm. The main difference between groups (I) and(II) is the casting position. The third group (III) consists offour specimens having the same reinforcing ratio 0.295%and casting position (Bottom) but different in the splice length
(0, 20, 30, and 40) times bar diameter 12 mm. The main differ-ence between group (I) and (III) is the bar diameter. Finally,group (IV) consists of four specimens having the same rein-
forcing ratio 0.424% and casting position (Bottom) but differ-ent in the splice length (0, 20, 30, and 40) times bar diameter12 mm. The main difference between groups (III) and (IV) is
the reinforcement ratio. Fig. 1a and b shows the reinforcementdetails of the tested beams.
2.2. Materials
The mix used to cast the specimens was developed by trialbatching in the concrete research laboratories at Cairo Univer-
Table 1 Details of test specimens.
Group No. Specimen designation Casting position
I 1 M-B-L0x10-R.295 Bottom
2 M-B-L20x10-R.295 Bottom
3 M-B-L30x10-R.295 Bottom
4 M-B-L40x10-R.295 Bottom
II 5 M-T-L0x10-R.295 Top
6 M-T-L20x10-R.295 Top
7 M-T-L30x10-R.295 Top
8 M-T-L40x10-R.295 Top
III 9 M-B-L0x12-R.295 Bottom
10 M-B-L20x12-R.295 Bottom
11 M-B-L30x12-R.295 Bottom
12 M-B-L40x12-R.295 Bottom
IV 13 M-B-L0x12-R.424 Bottom
14 M-B-L20x12-R.424 Bottom
15 M-B-L30x12-R.424 Bottom
16 M-B-L40x12-R.424 Bottom
sity and Ain-Shams University. The materials used in themixes are Ordinary Portland cement, natural clean sand;coarse aggregate, Silica fume and a super-plasticizer. The cho-
sen mix for casting the specimens was designed to develop cubestrength of 59.4 N/mm2. Table 2 shows the weights required tocast one cubic meter of the chosen concrete mix.
2.3. Test procedure
Static hydraulic loading jack with an electrical load cell was
used to apply the concentrated vertical loads. A digital loadindicator with 1 kN accuracy was used to measure the appliedload. Each beam was centered on the testing machine, while
loads were applied with increment of 5 kN. Fig. 2 shows a pho-tograph for the general test arrangement, and Fig. 3 shows aschematic view of the test arrangement. Specimens cast in atop cast position were turned upside down before being placed
on the test frame.At every load increment, cracks were observed and marked
and continuous recording for deflection, steel strains and load
value from the loading cell using data accusation system. Fail-ure was considered to occur when the load could not be in-creased further.
The deflections were measured at the mid-span of the beamby a LVDT instrument gauge of 0.01 mm accuracy. The crackpropagation was plotted on the concrete beams during load-ing. The steel strains at mid-span were measured using
10 mm gauge length for one deformed bar in the splice region.
2.4. Test results
Tests were performed on sixteen beams cast using highstrength self-compacted concrete reinforced with lap splice inmid-span (tension zone), which were subjected to incremental
load up to failure. The design parameters taken into consider-ation include casting position, splice length as a factor of thebar diameter with two different bar diameters, and reinforce-
ment ratios.Effect of the previous parameters on the splice length in
self-compacted high strength concrete beams will be discussed
Splice length Rft. Bar biameter (mm) Rft. ratio (%)
– 10 0.295
20B 10 0.295
30B 10 0.295
40B 10 0.295
– 10 0.295
20B 10 0.295
30B 10 0.295
40B 10 0.295
– 12 0.295
20B 12 0.295
30B 12 0.295
40B 12 0.295
– 12 0.424
20B 12 0.424
30B 12 0.424
40B 12 0.424
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(a)
(b)Figure 1 (a and b) Typical elevation and sections of specimens.
322 M.A. El-Azab et al.
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Table 2 Design of the concrete mix (per m3).
Material Weight (kN) Material Weight (kN)
Coarse aggregate (Gravel) 7.50 Fine aggregate (Sand) 7.50
Cement 4.25 Water 1.60
Silica fume 0.50 Super plasticizer (Sikament R2002) 0.10
Figure 2 Test instrumentation.
Figure 3 Schematic view of the test arrangement.
Effect of tension lap splice of high strength self-compacted concrete beams 323
in this section. The discussion of results will focus on the crackpropagation, crack pattern, and failure mode.
The cracking and failure loads of the specimens will also bediscussed as well as load–deflection relationship. In addition,load-reinforcement’s strain relationship and ductility of thebeams will be examined.
2.4.1. Crack pattern, cracking and failure loads
For each beam during the test, a continuous recording of load-ing, midspan deflection, and strains using computerized data
accusation system was carried out. During the loading opera-tion, continuous plotting for the cracks and marking their cor-responding load, the crack propagation, crack pattern and
failure mode were listed. Table 3 gives the cracking and ulti-mate failure loads with the corresponding mid-span deflectionwhile Fig. 4 shows the crack pattern at failure for each
specimen.As noticed from table and figures, a short splice length
(20B) led to slippage failure while – in general – a moderate
splice (30B) and a long splice (40B) led to flexure failure asno-splice specimens. Also, as noticed from Fig. 4, the crackpattern is mainly a flexure and shear cracks for all specimens.
Flexure cracks started inside the middle third of the beam(zone of constant maximum moment) and increased in numberand width all over the beam length with load increase while
shear cracks started near supports after first flexure crack oc-curred. Slippage cracks occurred in short splice specimens.
2.4.2. Results classification
A subgroup system will be used to discuss the effect of thestudied parameters on the beam behavior. Each subgroup con-sists of 2–4 specimens from the main groups (I, II, III and IV)
and has the same properties except the studied variable. Thesubgroups will have a notation A, B, C or D. Subgroups(A1, A2, A3 and A4) focus on the effect of the splice length
while subgroups (B1, B2, B3 and B4) focus on the effect ofreinforcement bar diameter. Subgroups (C1, C2, C3 and C4)and (D1, D2, D3 and D4) focus on the effect of casting posi-
tion and reinforcement ratio respectively.
2.4.3. Cracking and failure loads
2.4.3.1. Effect of splice length. Comparing the results obtainedfrom Table 3 and Figs. 5–8 for subgroups (A1, A2, A3 andA4), short splice length (20B) decreases both the cracking
and failure loads by an average of 15% with respect to no-spliced specimens. For moderate splice (30B) a decrease incracking load of about 10% was recorded while an increase
of about 9% was recorded in failure load values. There wasno increase in the cracking loads for specimens with (40B)splice, while only 6% increase was recorded in failure loadvalues.
2.4.3.2. Effect of bar diameter. Comparing the results of groups(I and III) given in Table 3 and Figs. 9–12 for subgroups (B1,
B2, B3 and B4), there is no change in the average cracking loadwhile an average decrease in failure load of about 11% was re-corded. Bond strength decreases with the decrease in the rein-
forcement total surface areas and since increasing bar diameterfrom 10 mm to 12 mm with the same reinforcement ratio led todecreasing of reinforcement total surface areas, the beam fail-
ure load decreased.
2.4.3.3. Effect of casting position. Comparing the results ofgroups (I and II) given in Table 3 and Figs. 13–16 for sub-
groups (C1, C2, C3 and C4), an average decrease in bothcracking and failure loads of about 29% and 22% respectivelywas recorded. As known, bond strength between Rft. and con-
crete varied according to bar location. For top steel reinforce-ment, bond strength decreased by about 23% with respect tobottom reinforcement.
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Table 3 Cracking and ultimate loads for HSSCC beams.
Group no. Beam Cracking stage Final stage Failure mode
Cracking load (kN) Deflection (mm) Failure load (kN) Deflection (mm)
I M-B-L0X10-R0.295 90 0.73 245 23 Flexure
M-B-L20X10-R0.295 50 0.55 230 5.5 Slippage
M-B-L30X10-R0.295 80 0.7 290 13 Flexure
M-B-L40X10-R0.295 90 1.43 270 34 Flexure
II M-T-L0X10-R0.295 80 0.8 220 38 Flexure
M-T-L20X10-R0.295 60 0.9 195 7.5 Slippage
M-T-L30X10-R0.295 40 0.65 200 12 Flexure
M-T-L40X10-R0.295 40 0.3 195 24.5 Flexure
III M-B-L0X12-R0.295 50 0.75 230 37.5 Flexure
M-B-L20X12-R0.295 90 1 195 5 Slippage
M-B-L30X12-R0.295 90 1.1 260 36 Flexure
M-B-L40X12-R0.295 80 1.3 230 24 Flexure
IV M-B-L0X12-R0.424 110 1.05 320 32 Flexure
M-B-L20X12-R0.424 85 0.95 245 4.1 Slippage
M-B-L30X12-R0.424 90 0.9 355 34.5 Slippage
M-B-L40X12-R0.424 120 0.8 380 32 Flexure
324 M.A. El-Azab et al.
2.4.3.4. Effect of reinforcement ratio. Comparing the results ofgroups (III and IV) given in Table 3 and Figs. 17–20 for sub-groups (D1, D2, D3 and D4), an average increase in bothcracking and failure loads of about 30% and 42% respectively
was recorded due to the increase in the Rft. ratio of about44%.
2.4.4. Load–deflection relationship
Load–midspan deflection curves for all specimens according tosubgroup classifications are shown in from Figs. 5–20.
2.4.4.1. Effect of splice length. Figs. 5–8 shows Load–Deflec-tion relationship for subgroups (A1, A2, A3 and A4). As no-ticed from figures, the results obtained from beams with
splice length equal to 20 times bar diameter always have deflec-tion values bigger than those without splices at the same loadvalue. The values obtained for beams with 30 and 40 times bar
diameter splice length show behavior similar to beams withoutsplices with failure loads equal or greater than beams withoutsplice. This is because while 20 times bar diameter splice lengthwas not enough to make Rft. act as non-spliced Rft., 30 and 40
times bar diameter spliced Rft. act together as a main tensionRft. and carries part of the tension stresses occurred due toflexure.
2.4.4.2. Effect of bar diameter. It was noticed from Load–Deflection relationship for subgroups (B1, B2, B3 and B4)
shown in Figs. 9–12 that the results obtained from beams withbar diameter 12 mm always have deflection values greater thanthose with bar diameter 10 mm at the same load value.
2.4.4.3. Effect of casting position. It was noticed from Load–Deflection relationship for subgroups (C1, C2, C3 and C4)shown in Figs. 13–16 that the results obtained from top cast
beams always have deflection values greater than bottom castbeams at the same load value.
2.4.4.4. Effect of reinforcement ratio. Comparing the results ofgroups given in Figs. 17–20 for subgroups (D1, D2, D3 and
D4), low deflection values at the same load level due to an in-crease in the Rft. ratio by about 44%.
2.4.5. Ductility of specimens
Ductility of specimen could be represented by the area underLoad–Deflection curve. The bigger area under the curve, the
more ductile behavior specimen has. Effect of each parameteron beam ductility will be discussed below.
2.4.5.1. Effect of splice length. Figs. 5–8 show Load–Deflectionrelationship for subgroups (A1, A2, A3 and A4). As noticedfrom figures, all specimens with 20 times bar diameter behavior
were brittle. The area obtained under the curves for thesebeams smaller than those without splices by an average of75%. The values obtained for beams with 30 and 40 timesbar diameter splice length bigger than beams without splices
by about 30% and 50% respectively.
2.4.5.2. Effect of bar diameter. It was noticed from Load–
Deflection relationship for subgroups (B1, B2, B3 and B4)shown in Figs. 9–12 that the results obtained from beams withbar diameter 10 mm always have ductility more than those
with bar diameter 12 mm by an average value of 25%.
2.4.5.3. Effect of casting position. It was noticed from Load–
Deflection relationship for subgroups (C1, C2, C3 and C4)shown in Figs. 13–16 that the results obtained from top castbeams always have ductility more than those from bottom castbeams by an average value of 35%.
2.4.5.4. Effect of reinforcement ratio. Comparing the results ofgroups given in Figs. 17–20 for subgroups (D1, D2, D3 and
D4), higher ductility by about 60% was recorded due to an in-crease in the Rft. ratio by about 44%.
2.4.6. Codes formulae for splice length
As given in Appendix A, ECP-203 [11] gives an equation forcalculating the minimum splice length for tension splice takinginto consideration concrete strength (fcu), steel yield stress (fy),
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Crack Pattern of M-B-L0X10 R0.295 Crack Pattern of M-B-L20X10 R0.295
Crack Pattern of M-B-L30X10 R0.295 Crack Pattern of M-B-L40X10 R0.295
(a) Crack Pattern and Failure Mode for Group (I) Beams
Crack Pattern of M-T-L0X10 R0.295 Crack Pattern of M-T-L20X10 R0.295
Crack Pattern of M-T-L30X10 R0.295 Crack Pattern of M-T-L40X10 R0.295
(b) Crack Pattern and Failure Mode for Group (II) Beams
Crack Pattern of M-B-L0X12 R0.295 Crack Pattern of M-B-L20X12 R0.295
Crack Pattern of M-B-L30X12 R0.295 Crack Pattern of M-B-L40X12 R0.295
(c) Crack Pattern and Failure Mode for Groups (III) Beams
Crack Pattern of M-B-L0X12 R0. 424 Crack Pattern of M-B-L20X12 R0. 424
Crack Pattern of M-B-L30X12 R0. 424 Crack Pattern of M-B-L40X12 R0. 424
(d) Crack Pattern and Failure Mode for Groups (IV) Beams
Figure 4 Crack pattern and failure mode for beams.
Effect of tension lap splice of high strength self-compacted concrete beams 325
bar surface shape (b factor), bar end shape (a factor) and barlocation (top or bottom bar as g factor). However, ACI318M-11 [10] gives another equation taking into consideration con-crete strength (fcu), steel yield stress (fy), coating factor (we),
location factor (wt) and concrete type factor (k) for lightweightor normal weight concrete.
Using research data, the calculated required splice length byECP-203 is about 36B for bottom casting and 47B for top
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Figure 5 Load–deflection curves for subgroup (A1).
Figure 6 Load–deflection curves for subgroup (A2).
Figure 7 Load–deflection curves for subgroup (A3).
Figure 8 Load–deflection curves for subgroup (A4).
Figure 9 Load–deflection curves for subgroup (B1).
Figure 10 Load–deflection curves for subgroup (B2).
Figure 11 Load–deflection curves for subgroup (B3).
Figure 12 Load–deflection curves for subgroup (B4).
326 M.A. El-Azab et al.
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Figure 13 Load–deflection curves for subgroup (C1).
Figure 14 Load–deflection curves for subgroup (C2).
Figure 15 Load–deflection curves for subgroup (C3).
Figure 16 Load–deflection curves for subgroup (C4).
Figure 17 Load–deflection curves for subgroup (D1).
Figure 18 Load–deflection curves for subgroup (D2).
Figure 19 Load–deflection curves for subgroup (D3).
Figure 20 Load–deflection curves for subgroup (D4).
Effect of tension lap splice of high strength self-compacted concrete beams 327
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328 M.A. El-Azab et al.
casting while the required splice length by ACI 318M-11 is44B for both top and bottom casting.
As noticed from results, the best obtained results have been
recorded in case of specimens with 40B splice length for bothtop and bottom casting which too close to those recommendedby the both codes.
3. Conclusions
Based on the analysis of the results of the studied cases, the fol-
lowing conclusions can be obtained,
� Splice length of 20 times bar diameter is not sufficientto make the tension reinforcement act efficiently asno spliced reinforcement. All specimens having splicelength 20 times bar diameter failed in a brittle mode
under low loads with respect to specimens withoutspliced reinforcement.
� Splice length of 30 times bar diameter is critical to betaken as a sufficient splice length since beams some-
times started cracking and failed at a load smaller thanthose without splice.
� Splice length of 40 times bar diameter is almost theminimum splice length to be taken as a sufficient splicelength since beams started cracking and failed at a loadequal or higher than those without splice.
� The use of smaller bar diameter with the same rein-forcement amount increases both the beam capacityand ductility.
� Top casting decreases both the beam capacity and duc-tility by about 22% and 35% respectively.
� Increasing reinforcement ratio by about 44% increasesboth cracking and failure loads by about 30% and 42%
respectively with an increase in the beam ductility byabout 60%.
Finally, it is recommended – for generic conclusions – morestudies for different structural configurations and loadingssuch as long term loading should be carried out.
Also, it is recommended in the future to study more speci-mens experimentally and analytically with variable splicelengths and variable splice locations in beam to propose anequation for calculating the required splice length taking into
consideration all variables.
Appendix A
A.1. ECP 203-2007
Lap splice can be calculated using the following equation:
Ld ¼ a � b � gðfy=csÞ=ð4:fbuÞ ðA:1Þ
where g = 1.3 for splices near top surface of beams duringcasting, g = 1 for splices near bottom surface of beams,b = 0.75 for deformed bars, a = 1 for straight bars,
Fbu ¼ 0:3ffiffiffiffiffiffiffiffiffiffiffiffiffiffi55=1:5
p¼ 1:817 N/mm2, Ld ¼ 1�0:75�1�ø4�1:817 � 4001:15 ffi 36ø
for bottom reinforcement, Ld ¼ 1�0:75�1:3�4�1:817 � 4001:15 ffi 47ø for topreinforcement.
A.2. ACI 318M-11
According to article 7.10.4.5, lap splices not less than the largerof 300 mm and 48db for deformed uncoated bar or wire.
According to article 12.2.3, for deformed bars or deformed
wire, lap splice can be calculated using the following equation:
Ld ¼ ðfywtwe=2:1ffiffiffiffifnc
qÞdb ðA:2Þ
where wt is the traditional reinforcement location factor to re-flect the adverse effects of the top reinforcement casting posi-tion, we is a coating factor reflecting the effects of epoxycoating if any, k shall not exceed 0.75 for lightweight concreteand k = 1.0 for normal weight concrete.
In studied case:
we = 1.0,uncoated reinforcementwt = 1.0 for regular bottom cast beams and wt = 1.3 fortop cast beams.
The ACI code required (wt · we) not less than 1.7, and so,
For bottom cast beams Ld ¼400� ð1:7Þ
2:1� 1�ffiffiffiffiffi55p � db ffi 44db
For top cast beams Ld ¼400� ð1:7Þ
2:1� 1�ffiffiffiffiffi55p � db ffi 44db
References
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app27Effect of tension lap splice on the behavior of high strength self-compacted concrete beams1 Introduction2 Experimental work2.1 Test specimens2.2 Materials2.3 Test procedure2.4 Test results2.4.1 Crack pattern, cracking and failure loads2.4.2 Results classification2.4.3 Cracking and failure loads2.4.3.1 Effect of splice length2.4.3.2 Effect of bar diameter2.4.3.3 Effect of casting position2.4.3.4 Effect of reinforcement ratio
2.4.4 Load–deflection relationship2.4.4.1 Effect of splice length2.4.4.2 Effect of bar diameter2.4.4.3 Effect of casting position2.4.4.4 Effect of reinforcement ratio
2.4.5 Ductility of specimens2.4.5.1 Effect of splice length2.4.5.2 Effect of bar diameter2.4.5.3 Effect of casting position2.4.5.4 Effect of reinforcement ratio
2.4.6 Codes formulae for splice length
3 ConclusionsAppendix AA.1 ECP 203-2007A.2 ACI 318M-11
References